Optimal unimodular matchings

Nathanaël Enriquez; Mike Liu; Laurent Ménard; Vianney Perchet

doi:10.1007/s00440-025-01429-x

Optimal unimodular matchings

Nathanaël Enriquez
, Mike Liu
, Laurent Ménard
, Vianney Perchet

Research output: Contribution to journal › Article › peer-review

Abstract

We consider sequences of finite weighted random graphs that converge locally to unimodular i.i.d. weighted random trees. When the weights are atomless, we prove that the matchings of maximal weight converge locally to a matching on the limiting tree. For this purpose, we introduce and study unimodular matchings on weighted unimodular random trees as well as a notion of optimality for these objects. In this context, we prove that, in law, there is a unique optimal unimodular matching for a given unimodular tree. We then prove that this law is the local limit of the sequence of matchings of maximal weight. Along the way, we also show that this law is characterised by an equation derived from a message-passing algorithm.

Original language	English
Journal	Probability Theory and Related Fields
DOIs	https://doi.org/10.1007/s00440-025-01429-x
Publication status	Accepted/In press - 1 Jan 2025
Externally published	Yes

Keywords

Local convergence
Optimal matchings
Sparse random graphs
Unimodularity

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10.1007/s00440-025-01429-x

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title = "Optimal unimodular matchings",

abstract = "We consider sequences of finite weighted random graphs that converge locally to unimodular i.i.d. weighted random trees. When the weights are atomless, we prove that the matchings of maximal weight converge locally to a matching on the limiting tree. For this purpose, we introduce and study unimodular matchings on weighted unimodular random trees as well as a notion of optimality for these objects. In this context, we prove that, in law, there is a unique optimal unimodular matching for a given unimodular tree. We then prove that this law is the local limit of the sequence of matchings of maximal weight. Along the way, we also show that this law is characterised by an equation derived from a message-passing algorithm.",

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AU - Enriquez, Nathanaël

AU - Liu, Mike

AU - Ménard, Laurent

AU - Perchet, Vianney

N1 - Publisher Copyright: © The Author(s), under exclusive licence to Springer-Verlag GmbH Germany, part of Springer Nature 2025.

PY - 2025/1/1

Y1 - 2025/1/1

N2 - We consider sequences of finite weighted random graphs that converge locally to unimodular i.i.d. weighted random trees. When the weights are atomless, we prove that the matchings of maximal weight converge locally to a matching on the limiting tree. For this purpose, we introduce and study unimodular matchings on weighted unimodular random trees as well as a notion of optimality for these objects. In this context, we prove that, in law, there is a unique optimal unimodular matching for a given unimodular tree. We then prove that this law is the local limit of the sequence of matchings of maximal weight. Along the way, we also show that this law is characterised by an equation derived from a message-passing algorithm.

AB - We consider sequences of finite weighted random graphs that converge locally to unimodular i.i.d. weighted random trees. When the weights are atomless, we prove that the matchings of maximal weight converge locally to a matching on the limiting tree. For this purpose, we introduce and study unimodular matchings on weighted unimodular random trees as well as a notion of optimality for these objects. In this context, we prove that, in law, there is a unique optimal unimodular matching for a given unimodular tree. We then prove that this law is the local limit of the sequence of matchings of maximal weight. Along the way, we also show that this law is characterised by an equation derived from a message-passing algorithm.

KW - Local convergence

KW - Optimal matchings

KW - Sparse random graphs

KW - Unimodularity

UR - https://www.scopus.com/pages/publications/105019600876

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DO - 10.1007/s00440-025-01429-x

M3 - Article

AN - SCOPUS:105019600876

SN - 0178-8051

JO - Probability Theory and Related Fields

JF - Probability Theory and Related Fields

ER -

Optimal unimodular matchings

Abstract

Keywords

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